congruent

简明释义

英[ˈkɒŋɡruənt]美[ˈkɑːŋɡruənt]

adj. 相合的，一致的；（图形）全等的，叠合的

英英释义

单词用法

同义词

反义词

例句

1.For a congruent patellofemoral articulation, the patella must track centrally in the trochlear groove.

在正常的髌股关节中，髌骨的活动轨迹应处于滑车沟的中心。

2.But not all practices are congruent.

但是不是所有的实践都是适合的。

3.It is very congruent with my personality.

它非常符合我的性格。

4.I was off and running, I was happy, congruent, and really proud of myself.

我开始发掘自己能力，我对此感到快乐，觉得这很适合自己，并真的感到自豪。

5.The clip art directory is clearly not congruent with the user's goal of drawing-it is only a means to an end.

剪贴画目录显然与用户画图的目标并不切合——它只是达到最终目的的一种手段。

6.What's the most compact way of packing a crate of oranges - or any congruent spheres for that matter?

包装一箱桔子或堆积等大球体的最紧密方法是什么？

7.At times this is very difficult because what they say and what they feel are sometimes not congruent.

有时候，这很难，因为他们所说的和他们所感受的有时候是不一致的。

8.Two triangles are congruent if they have two angles and the included side equal.

两个三角形如果有两个角及其夹边对应相等则它们全等。

9.All of these are congruent triangles.

所有这些都是全等三角形。

10.The two triangles are congruent because they have the same size and shape.

这两个三角形是全等的，因为它们具有相同的大小和形状。

11.In mathematics, we often use congruent figures to prove geometric theorems.

在数学中，我们经常使用全等的图形来证明几何定理。

12.The architect designed the two buildings to be congruent in style and proportion.

建筑师设计这两座建筑时，使其在风格和比例上是一致的。

13.In a congruence relation, if two numbers are congruent, they have the same remainder when divided by a certain number.

在一个同余关系中，如果两个数字是全等的，那么它们在被某个数字除时会有相同的余数。

14.The teacher explained that two angles are congruent if they measure the same in degrees.

老师解释说，如果两个角的度数相同，它们就是全等的。

作文

In mathematics, the term congruent refers to figures that have the same shape and size. This concept is not only fundamental in geometry but also finds its application in various fields such as architecture, engineering, and even art. Understanding the idea of congruent shapes is crucial for students as it lays the groundwork for more complex mathematical concepts. For instance, consider two triangles that are congruent. This means that if you were to overlay one triangle on top of the other, they would match perfectly. Their corresponding sides and angles are equal, which is a significant property when solving problems related to triangles. The concept of congruent shapes allows mathematicians and engineers to create precise models and blueprints, ensuring that every part of a structure is accurately designed. Moreover, the idea of congruent extends beyond mere shapes. In everyday life, we often encounter situations where we need to find items that are congruent in function or purpose. For example, two different brands of a smartphone may be congruent in features, even though they differ in design and brand name. This understanding helps consumers make informed decisions based on their needs rather than brand loyalty. In art, the concept of congruent can be observed in symmetry. Symmetrical designs are often aesthetically pleasing and can evoke a sense of harmony. Artists frequently utilize congruent shapes to create balance in their work. By understanding how to manipulate congruent forms, artists can enhance the visual impact of their creations. Furthermore, in psychology, the idea of congruent behavior is essential. When a person’s actions align with their values and beliefs, they are considered to be acting in a congruent manner. This alignment is crucial for personal integrity and can significantly affect one’s mental well-being. Individuals who experience a disconnect between their actions and beliefs often face internal conflict, leading to stress and anxiety. In conclusion, the term congruent encompasses a wide range of meanings and applications across various disciplines. Whether in mathematics, art, consumer products, or psychology, the idea of congruent shapes, behaviors, and functions plays a vital role in our understanding of the world around us. By grasping the concept of congruent, individuals can enhance their analytical skills and make more informed decisions in both academic and everyday contexts. Thus, it is essential to appreciate the significance of congruent relationships, as they form the foundation of coherence and unity in multiple aspects of life.

在数学中，术语congruent指的是具有相同形状和大小的图形。这个概念不仅在几何学中是基础，而且在建筑、工程甚至艺术等多个领域都有应用。理解congruent形状的概念对学生来说至关重要，因为它为更复杂的数学概念奠定了基础。 例如，考虑两个三角形，它们是congruent的。这意味着如果你将一个三角形叠加在另一个上面，它们会完美匹配。它们的对应边和角是相等的，这是解决与三角形相关的问题时的重要属性。congruent形状的概念使数学家和工程师能够创建精确的模型和蓝图，确保结构的每个部分都被准确设计。 此外，congruent的概念超越了单纯的形状。在日常生活中，我们经常遇到需要寻找在功能或目的上是congruent的物品的情况。例如，两种不同品牌的智能手机可能在功能上是congruent的，即使它们在设计和品牌名称上有所不同。这种理解帮助消费者根据他们的需求而不是品牌忠诚度做出明智的决策。 在艺术中，congruent的概念可以在对称性中观察到。对称设计通常是美观的，并且可以唤起和谐感。艺术家经常利用congruent形状来创造作品中的平衡。通过理解如何操控congruent形式，艺术家可以增强其创作的视觉冲击力。 此外，在心理学中，congruent行为的概念也至关重要。当一个人的行为与他们的价值观和信念一致时，他们被认为是在以congruent的方式行事。这种一致性对于个人诚信至关重要，并且可以显著影响一个人的心理健康。经历行为与信念之间不一致的人往往会面临内心冲突，导致压力和焦虑。 总之，术语congruent涵盖了多个学科中广泛的含义和应用。无论是在数学、艺术、消费产品还是心理学中，congruent的形状、行为和功能的概念在我们理解周围世界中发挥着重要作用。通过掌握congruent的概念，个人可以增强他们的分析能力，并在学术和日常环境中做出更明智的决策。因此，欣赏congruent关系的重要性至关重要，因为它们构成了生活多个方面中连贯性和统一性的基础。